What is the expected distribution of RMS displacement of 2-points randomly walking in n dimensions

3 visualizaciones (últimos 30 días)
Ben Ward
Ben Ward el 18 de Jun. de 2020
Comentada: Ben Ward el 19 de Jun. de 2020
Hi,
I am modelling a process as a random walk in n-dimensions. I would like to know the expected distribution (mean and stdev) of the RMS displacement between 2 independently-walking points after t steps.
I think the expected value in one dimension is simply , but I do not know what the standard deviation should be, and I cannot generalise either to n dimensions.
I feel like I should be able to find the answer to this fairly easily, but so far any solutions I have found onine do not match up with the code I have pasted below.
Can anyone suggest equations that give the mean and standard deviations of the expected distribution of the euclidean distance between to points after t steps in n dimensions? Ideally I would like solutions for both Lattice and Gaussian random walks.
Thanks,
Ben
% expected RMS displacement of lattice or Gaussian random walk
walk_type = 'Gaussian'; % 'Gaussian' or 'Lattice'
% random walk in ndim dimensions
ndim = 1;
% number of repetitions
niter = 1e2;
% number of steps in random walk
nsteps = 1e2;
d = zeros(nsteps,niter); % initialise distance array
for k=1:niter % repeat niter times
coord=zeros(2,ndim); % initialise walk at origin
for t=1:nsteps % walk for nsteps
% take random walk step
switch walk_type
case 'Lattice'
coord = coord + sign(randn(2,ndim));
case 'Gaussian'
coord = coord + randn(2,ndim);
end
% save euclidean distance between two points at time t
d(t,k)=pdist(coord,'euclidean');
end
end
figure(1)
clf
tsteps=1:nsteps;
stairs(tsteps,d,'-','LineW',0.1,'Color',[0.75 0.75 0.75])
hold on
plot(tsteps,mean(d,2),'k-','LineW',2) % plot evaluated mean
plot(tsteps,mean(d,2)*[1 1]+std(d,[],2)*[-1 1] ,'k--','LineW',2) % plot +/- evaluated stdev
% calculate and plot theoretical mean (and stdev?)
d_expected = sqrt(2*tsteps);
% d_stdev = ???
plot(tsteps,d_expected,'g--','LineW',2)
  • edited because I forgot to account for displacement of 2 points (E(d) = not )
  1 comentario
Ben Ward
Ben Ward el 19 de Jun. de 2020
I will have a go at answering my question, although I am not certain I have it right. I think the expected RMS displacement between two points undergoing independent random walks in dimensions after n steps is given by
with a standard deviation of
This seems to agree with the outcome of simulations, but I do not have a good source to back it up.

Iniciar sesión para comentar.

Iniciar sesión para responder a esta pregunta.

Respuestas (0)

Categorías

Más información sobre Random Number Generation en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by